2.3.17 Let {xn}n€N be a sequence in a metric space X. Show that if InI, then either: (a) there exists an open set U that contains x and there is some N>0 such that xn = x for alln> N, or (b) every open set U that contains x must also contain infinitely many distinct xn (that is, the set {xn n E N and xn E U} contains infinitely many elements).

2.3.17 Let {xn}n€N be a sequence in a metric space X. Show that if InI, then either: (a) there exists an open set U that contains x and there is some N>0 such that xn = x for alln> N, or (b) every open set U that contains x must also contain infinitely many distinct xn (that is, the set {xn n E N and xn E U} contains infinitely many elements).

Name: Material :Daly analysis 2.3.17 Let {xn}nEN be a sequence in a metric s
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Description: Material :Daly analysis 2.3.17 Let {xn}nEN be a sequence in a metric space X. Show that if rnx,then either:(a) there exists an open set U that contains x and there is some N> 0such that xn= x for all n> N, or(b) every open set U that contains r must

Advanced Engineering Mathematics

10th Edition

ISBN:9780470458365

Author:Erwin Kreyszig

Publisher:Erwin Kreyszig

Chapter2: Second-order Linear Odes

Section: Chapter Questions

Problem 1RQ

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